This rug has both a horizontal and a vertical line of reflectional symmetry because it can be divided into forths and each forth is the same pattern. The rug also has 1-fold rotational symmetry because you can rotate it 180 degrees and the pattern would be the same.
The overview of this pot creates a design that has a line of horizontal and vertical reflectional symmetry. This pot also has two diagonal lines of symmetry and 3-fold rotational symmetry because it looks the same after you rotate it 90, 180, and 270 degrees.
This mirror has a horizontal, vertical and two diagonal lines of symmetry. It also has 3-fold rotational symmetry because you can rotate it 90, 180, and 270 degrees and it would still look the same.
This circular light fixture has a horizontal, vertical, and four diagonal lines of reflectional symmetry. It also has 5-fold rotational symmetry because it looks the same after rotating it 60, 120, 180, 240, and 300 degrees.
This agua vase only has one vertical line of reflectional symmetry.
This mirror only has 15 lines of reflectional symmetry because the indented design around the mirror part is made up of little shapes that look like ovals but actually have one flat side. It has 14-fold rotational symmetry and can therefore be rotated 24, 48, 72, 96, 120, 144, 168, 192, 216, 240, 264, 288, 312, and 336 times and still look the same.
The underview of this glass chandalier creates a octagonal shape which has eight lines of reflectional symmetry. It also has 7-fold rotational symmetry because it can be rotated 45, 90, 135, 180, 225, 270, and 315 degrees and still look the same.
This swarovski crystal swan only has one vertical line for refletional symmetry.
These sketches of a pots both only have one vertical line of reflectional eymmetry.
This gold foiled plate has 6 lines of reflectional symmetry. It also has 5-fold rotational symmetry because it looks the same after rotating it 60, 120, 180, 240, and 300 degrees.
This rug has both a horizontal and a vertical line of reflectional symmetry because it can be divided into forths and each forth is the same pattern. The rug also has 1-fold rotational symmetry because you can rotate it 180 degrees and the pattern would be the same.
The overview of this pot creates a design that has a line of horizontal and vertical reflectional symmetry. This pot also has two diagonal lines of symmetry and 3-fold rotational symmetry because it looks the same after you rotate it 90, 180, and 270 degrees.
This mirror has a horizontal, vertical and two diagonal lines of symmetry. It also has 3-fold rotational symmetry because you can rotate it 90, 180, and 270 degrees and it would still look the same.
This circular light fixture has a horizontal, vertical, and four diagonal lines of reflectional symmetry. It also has 5-fold rotational symmetry because it looks the same after rotating it 60, 120, 180, 240, and 300 degrees.
This agua vase only has one vertical line of reflectional symmetry.
This mirror only has 15 lines of reflectional symmetry because the indented design around the mirror part is made up of little shapes that look like ovals but actually have one flat side. It has 14-fold rotational symmetry and can therefore be rotated 24, 48, 72, 96, 120, 144, 168, 192, 216, 240, 264, 288, 312, and 336 times and still look the same.
The underview of this glass chandalier creates a octagonal shape which has eight lines of reflectional symmetry. It also has 7-fold rotational symmetry because it can be rotated 45, 90, 135, 180, 225, 270, and 315 degrees and still look the same.
This swarovski crystal swan only has one vertical line for refletional symmetry.
These sketches of a pots both only have one vertical line of reflectional eymmetry.
This gold foiled plate has 6 lines of reflectional symmetry. It also has 5-fold rotational symmetry because it looks the same after rotating it 60, 120, 180, 240, and 300 degrees.